Macroscopic scalar curvature and areas of cycles
Abstract
In this paper we prove the following. Let be an n--dimensional closed hyperbolic manifold and let g be a Riemannian metric on × S1. Given an upper bound on the volumes of unit balls in the Riemannian universal cover (× S1,g), we get a lower bound on the area of the Z2--homology class [ × ] on × S1, proportional to the hyperbolic area of . The theorem is based on a theorem of Guth and is analogous to a theorem of Kronheimer and Mrowka involving scalar curvature.
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